Minimum degree condition forcing complete graph immersion

Abstract

An immersion of a graph H into a graph G is a one-to-one mapping f:V(H) V(G) and a collection of edge-disjoint paths in G, one for each edge of H, such that the path Puv corresponding to edge uv has endpoints f(u) and f(v). The immersion is strong if the paths Puv are internally disjoint from f(V(H)). It is proved that for every positive integer t, every simple graph of minimum degree at least 200t contains a strong immersion of the complete graph Kt. For dense graphs one can say even more. If the graph has order n and has 2cn2 edges, then there is a strong immersion of the complete graph on at least c2 n vertices in G in which each path Puv is of length 2. As an application of these results, we resolve a problem raised by Paul Seymour by proving that the line graph of every simple graph with average degree d has a clique minor of order at least cd3/2, where c>0 is an absolute constant. For small values of t, 1 t 7, every simple graph of minimum degree at least t-1 contains an immersion of Kt (Lescure and Meyniel, DeVos et al.). We provide a general class of examples showing that this does not hold when t is large.